Outer Independent Roman Domination Number of Cartesian Product of Paths and Cycles

Abstract

Given a graph G with vertex set V, an outer independent Roman dominating function (OIRDF) is a function f from V(G) to \0, 1, 2\ for which every vertex with label 0 under f is adjacent to at least a vertex with label 2 but not adjacent to another vertex with label 0. The weight of an OIRDF f is the sum of vertex function values all over the graph, and the minimum of an OIRDF is the outer independent Roman domination number of G, denoted as γoiR(G). In this paper, we focus on the outer independent Roman domination number of the Cartesian product of paths and cycles Pn Cm. We determine the exact values of γoiR(Pn Cm) for n=1,2,3 and γoiR(Pn C3) and present an upper bound of γoiR(Pn Cm) for n 4, m 4.

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